We present closed-form solutions to some discounted optimal stopping problems for the running maximum of a geometric Brownian motion with payoffs switching according to the dynamics of a continuous-time Markov chain with two states. The proof is based on the reduction of the original problems to the equivalent free-boundary problems and the solution of the latter problems by means of the smooth-fit and normal-reflection conditions. We show that the optimal stopping boundaries are determined as the maximal solutions of the associated two-dimensional systems of first-order nonlinear ordinary differential equations. The obtained results are related to the valuation of real switching lookback options with fixed and floating sunk costs in the Bl...
Consider two Brownian motions B1s1 and B2s2, each taking values on an interval [0,ai], i = 1,2, with...
We consider optimal stopping problems for a Brownian motion and a geometric Brownian motion with a “...
We formulate an optimal stopping problem for a geometric Brownian motion where the probability scale...
We present closed-form solutions to some discounted optimal stopping problems for the running maximu...
We present closed-form solutions to some double optimal stopping problems with payoffs representing ...
We present a solution to some discounted optimal stopping problem for the maximum of a geometric Bro...
We present analytic solutions to some optimal stopping problems for the running minimum of a geometr...
We present closed-form solutions to some double optimal stopping problems with payoffs representing ...
This thesis considers several optimal stopping problems motivated by mathematical fi- nance, using t...
In this paper we present closed form solutions of some discounted optimal stopping problems for the ...
We present solutions to some discounted optimal stopping problems for the maximum process in a model...
We present solutions to some discounted optimal stopping problems for the maximum process in a model...
We present closed-form solutions to a discounted optimal stopping zero-sum game in a model with a ge...
We study optimal stopping problems related to the pricing of perpetual American options in an extens...
We present a solution to an optimal stopping game for geometric Brownian motion with gain functions ...
Consider two Brownian motions B1s1 and B2s2, each taking values on an interval [0,ai], i = 1,2, with...
We consider optimal stopping problems for a Brownian motion and a geometric Brownian motion with a “...
We formulate an optimal stopping problem for a geometric Brownian motion where the probability scale...
We present closed-form solutions to some discounted optimal stopping problems for the running maximu...
We present closed-form solutions to some double optimal stopping problems with payoffs representing ...
We present a solution to some discounted optimal stopping problem for the maximum of a geometric Bro...
We present analytic solutions to some optimal stopping problems for the running minimum of a geometr...
We present closed-form solutions to some double optimal stopping problems with payoffs representing ...
This thesis considers several optimal stopping problems motivated by mathematical fi- nance, using t...
In this paper we present closed form solutions of some discounted optimal stopping problems for the ...
We present solutions to some discounted optimal stopping problems for the maximum process in a model...
We present solutions to some discounted optimal stopping problems for the maximum process in a model...
We present closed-form solutions to a discounted optimal stopping zero-sum game in a model with a ge...
We study optimal stopping problems related to the pricing of perpetual American options in an extens...
We present a solution to an optimal stopping game for geometric Brownian motion with gain functions ...
Consider two Brownian motions B1s1 and B2s2, each taking values on an interval [0,ai], i = 1,2, with...
We consider optimal stopping problems for a Brownian motion and a geometric Brownian motion with a “...
We formulate an optimal stopping problem for a geometric Brownian motion where the probability scale...